The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits every hyperedge in at least m nodes. We extend the problem to a notion of hypergraphs with so-called hypernodes and show that, for m=2, it remains fixed-parameter tractable (FPT), parameterized by the number of hyperedges. This is accomplished by a nontrivial extension of the dynamic programming algorithm for hypergraphs. The algorithm might be interesting for certain assignment problems, but here we need it as a tool to solve another problem motivated by network analysis: A d-core of a graph is a subgraph in which every vertex has at least d neighbors. We give an FPT algorithm that computes a smallest 2-core including a given set of target v...
We study how many vertices in a rank-r hypergraph can belong to the union of all inclusion-minimal h...
We analyze a reduction rule for computing kernels for the hitting set problem: In a hypergraph, the ...
AbstractWe consider the Minimum Vertex Cover problem in hypergraphs in which every hyperedge has siz...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
A k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedges. We st...
AbstractA k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedge...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
Abstract. A sunflower in a hypergraph is a set of hyperedges pairwise in-tersecting in exactly the s...
AbstractMotivated by the need for succinct representations of all “small” transversals (or hitting s...
Motivated by the need for succinct representations of all "small" transversals (or hitting sets) of ...
AbstractIn the Hitting Set problem, we are given a collection F of subsets of a ground set V and an ...
Hypergraph multiway cut problem is a problem of finding a minimum capacity set of hyperedges whose r...
We study the complexity of the Hitting Set problem in set systems (hypergraphs) that avoid certain s...
We study how many vertices in a rank-r hypergraph can belong to the union of all inclusion-minimal h...
We analyze a reduction rule for computing kernels for the hitting set problem: In a hypergraph, the ...
AbstractWe consider the Minimum Vertex Cover problem in hypergraphs in which every hyperedge has siz...
The multiple weighted hitting set problem is to find a subset of nodes in a hypergraph that hits eve...
A k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedges. We st...
AbstractA k-hitting set in a hypergraph is a set of at most k vertices that intersects all hyperedge...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
Hitting Set is a classic problem in combinatorial optimization. Its input consists of a set system F...
Abstract. A sunflower in a hypergraph is a set of hyperedges pairwise in-tersecting in exactly the s...
AbstractMotivated by the need for succinct representations of all “small” transversals (or hitting s...
Motivated by the need for succinct representations of all "small" transversals (or hitting sets) of ...
AbstractIn the Hitting Set problem, we are given a collection F of subsets of a ground set V and an ...
Hypergraph multiway cut problem is a problem of finding a minimum capacity set of hyperedges whose r...
We study the complexity of the Hitting Set problem in set systems (hypergraphs) that avoid certain s...
We study how many vertices in a rank-r hypergraph can belong to the union of all inclusion-minimal h...
We analyze a reduction rule for computing kernels for the hitting set problem: In a hypergraph, the ...
AbstractWe consider the Minimum Vertex Cover problem in hypergraphs in which every hyperedge has siz...